Irreducible Characters and Semisimple Coadjoint Orbits

Abstract

When GR is a real, linear algebraic group, the orbit method predicts that nearly all of the unitary dual of GR consists of representations naturally associated to orbital parameters (O,). If GR is a real, reductive group and O is a semisimple coadjoint orbit, the corresponding unitary representation π(O,) may be constructed utilizing Vogan and Zuckerman's cohomological induction together with Mackey's real parabolic induction. In this article, we give a geometric character formula for such representations π(O,). Special cases of this formula were previously obtained by Harish-Chandra and Kirillov when GR is compact and by Rossmann and Duflo when π(O,) is tempered.